Piecewise Temperleyan dimers and a multiple SLE8

Abstract

We consider the dimer model on piecewise Temperleyan, simply connected domains, on families of graphs which include the square lattice as well as superposition graphs. We focus on the spanning tree Tδ associated to this model via Temperley's bijection, which turns out to be a Uniform Spanning Tree with singular alternating boundary conditions. Generalising the work of the second author with Peltola and Wu LiuPeltolaWuUST we obtain a scaling limit result for Tδ. For instance, in the simplest nontrivial case, the limit of Tδ is described by a pair of trees whose Peano curves are shown to converge jointly to a multiple SLE8 pair. The interface between the trees is shown to be given by an SLE2(-1, …, -1) curve. More generally we provide an equivalent description of the scaling limit in terms of imaginary geometry. This allows us to make use of the results developed by the first author and Laslier and Ray BLRdimers. We deduce that, universally across these classes of graphs, the corresponding height function converges to a multiple of the Gaussian free field with boundary conditions that jump at each non-Temperleyan corner. After centering, this generalises a result of Russkikh RusskikhDimers who proved it in the case of the square lattice. Along the way, we obtain results of independent interest on chordal hypergeometric SLE8; for instance we show its law is equal to that of an SLE8 ( ) for a certain vector of force points, conditional on its hitting distribution on a specified boundary arc.